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How can I prove that the language L={w|#a(w)=#b(w)=#c(w)} is not context free using closure ?



I know that the language L1 = {a^i b^i c^i | i>=0} is not a context free language . Now I'm trying to find another language L2 , where L2 would be a regular language , in order to make a contradiction , since if L1 is context free and L2 is a regular language , then L1∩L2 is also context free .

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can you show what you have tried please? – Preet Sangha Jun 13 '12 at 2:08
@PreetSangha: Done ,thanks . – ron Jun 13 '12 at 2:15
you might want to ask on instead if you get no answers here. – Preet Sangha Jun 13 '12 at 2:20

1 Answer 1

up vote 2 down vote accepted

Well, in order to get from L to L1, you need to impose an ordering on the a's, b's and c's. There's a really simple regular language you can intersect with L to impose this ordering - can you see what it is?

If you know how to prove that L3 = { w | #0(w) = #1(w) } is non-regular using closure properties, the proof of this one is really similar.

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I think you mean to L = {a*b*c*} ? – ron Jun 13 '12 at 2:37
Yup, you got it. – Shoaib Jun 13 '12 at 2:39

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